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Transcript
Physics 2102
Gabriela González
Physics 2102
Gauss’ law
Carl Friedrich Gauss
1777-1855
Electric Flux
F

r
r
E  dA
• Electric Flux
A surface integral!
• CLOSED surfaces:
– define
 the vector dA as pointing
OUTWARDS
– Inward E gives negative F
– Outward E gives positive F
Gauss’ Law
• Consider any ARBITRARY
CLOSED surface S -- NOTE:
this does NOT have to be a
“real” physical object!
• The TOTAL ELECTRIC FLUX
through S is proportional to the
TOTAL CHARGE
ENCLOSED!
• The results of a complicated
integral is a very simple
formula: it avoids long
calculations!
S
F

Surface
  q
E  dA 
0
(One of Maxwell’s 4 equations)
Gauss’ law, using symmetry
Shell theorem
Spherical symmetry
Planar symmetry
Two infinite planes
E+=s/20 E-=s/20
+Q
-Q
E=s/0
A uniform field!
E=0
E=0
Insulating and conducting
planes
s
Q
E

2 0 2 A 0
Q
Insulating plate: charge distributed homogeneously.
Q/2
s
Q
E 
 0 2 A 0
Conducting plate: charge distributed on the outer surfaces.
Gauss’ Law:
Cylindrical symmetry
• Charge of 10 C is uniformly spread
over a line of length L = 1 m.
• Use Gauss’ Law to compute
magnitude of E at a perpendicular
distance of 1 mm from the center of
the line.
• Approximate as infinitely long
line -- E radiates outwards.
• Choose cylindrical surface of
radius R, length L co-axial with
line of charge.
E=?
1m
R = 1 mm
Gauss’ Law: cylindrical
symmetry (cont)
• Approximate as infinitely long
line -- E radiates outwards.
• Choose cylindrical surface of
radius r, length h co-axial with
line of charge.
F | E | A | E | 2 r h
h
F 
0 0
q
h


|E |

 2k
2 0 rh 2 0 r
R
Compare with exact calculation!
L /2


x
kL
 k r  2 2 2  
r x  r -L / 2 r r 2  (L /2) 2
L /2
dx
E y  k r  2
2 3/2
(r

x
)
-L / 2
=Q/L

r

if the line is infinitely long (L >> r)…
kL
2k
Ey 

2
r
r (L /2)
Gauss’ law, using symmetry
Question
The figure shows four solid spheres, each with charge Q uniformly
distributed through its volume.
(a) Rank the spheres according to their volume charge density, greatest first.
The figure also shows a point P for each sphere, all at the same distance
from the center of the sphere.
(b) Rank the spheres according to the magnitude of the electric field they
produce at point P, greatest first.
Question
Three infinite nonconducting sheets, with uniform positive surface charge
densities σ, 2σ, and 3σ, are arranged to be parallel. What is their order,
from left to right, if the electric field produced by them is zero in one
region and has magnitude E= 2s/0 in another region?
Ch 23 Summary:
r
r
E  dA
• We define electric flux through a surface: F  
• Gauss’ law provides a very direct way to compute the
electric flux : F  qins /0

• In situations with symmetry, knowing the flux allows to
compute the fields reasonably easily:
– Spherical
field of a spherical uniform charge: kqins/r2

– Uniform field of an insulating plate: s/20, ; of a conducting
plate: s/0..
– Cylindrical field of a long wire: 2k/r
• Properties of conductors: field inside is zero; excess
charges are always on the surface; field on the surface is
perpendicular and E=s/0.
Problem
In the figure below, a nonconducting spherical shell of inner radius a
and outer radius b has (within its thickness) a positive volume charge
density ρ = A/r, where A is a constant and r is the distance from the
center of the shell. In addition, a small ball of charge q is located at
the center. What constant A produces a uniform electric field in the
shell a <r <b ?
Electric potential energy,
electric potential
Electric potential energy of a system =
= - work (against electrostatic forces)
needed to needed to build the system
U= - W
Electric potential difference between two
points = work per unit charge needed to move
a charge between the two points:
DV = Vf-Vi = -W/q
Electric potential energy,
electric potential
Units : [U] = [W]=Joules;
[V]=[W/q] = Joules/C= Nm/C= Volts
[E]= N/C = Vm
1eV = work needed to move an electron
through a potential difference of 1V:
W=qDV = e x 1V
= 1.60 10-19 C x 1J/C = 1.60 10-19 J
Electric field lines and
equipotential surfaces
Given a charged system, we can:
• calculate the electric field everywhere in space
• calculate the potential difference between every point and a
point where V=0
• draw electric field lines
• draw equipotential surfaces
http://phet.colorado.edu/en/simulation/charges-and-fields